Cycles as edge intersection hypergraphs
Abstract
If H=(V, E) is a hypergraph, its edge intersection hypergraph EI( H)=(V, EEI) has the edge set EEI=\e1 e2 \ |\ e1, e2 ∈ E \ \ e1 ≠ e2 \ \ |e1 e2 |≥2\. Picking up a problem from arXiv:1901.06292, for n 24 we prove that there is a 3-regular (and - if n is even - 6-uniform) hypergraph H=(V, E) with n2 hyperedges and EI( H) = Cn.
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